Dynamics of solutions in the 1d bi-harmonic nonlinear Schr\"odinger equation

Abstract

We consider the one dimensional 4th order, or bi-harmonic, nonlinear Schr\"odinger (NLS) equation, namely, i ut - 2 u - 2a u + |u|α u = 0, ~ x,a ∈ , α>0, and investigate the dynamics of its solutions for various powers of α, including the ground state solutions and their perturbations, leading to scattering or blow-up dichotomy when a ≤ 0, or to a trichotomy when a>0. Ground state solutions are numerically constructed, and their stability is studied, finding that the ground state solutions may form two branches, stable and unstable, which dictates the long-term behavior of solutions. Perturbations of the ground states on the unstable branch either lead to dispersion or the jump to a stable ground state. In the critical and supercritical cases, blow-up in finite time is also investigated, and it is conjectured that the blow-up happens with a scale-invariant profile (when a=0) regardless of the value of a of the lower dispersion. The blow-up rate is also explored.

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